Composite planetary device

ABSTRACT

A composite planetary speed reduction device ( 1 ), wherein gears ( 11 ), ( 12 ), and ( 13 ) and rollers ( 21 ), ( 22 ), and ( 23 ) forming a planetary gear speed reduction mechanism ( 10 ) and a planetary roller speed reduction mechanism ( 20 ) are integrally rotated around a common rotating center axis, respectively. The radius of the sun roller ( 21 ) is larger by Δr 1  than the radius r 1  of the working pitch circle of the sun gear ( 11 ), the radius r 21  of the working pitch circle of the planetary gear ( 12 ) meshing with the sun gear ( 11 ) and the radius r 23  of the working pitch circle of the planetary gear ( 12 ) meshing with an internal gear ( 13 ) are different from each other, and the radius of the planetary roller ( 22 ) is smaller by Δr 1  than the radius r 21  of the working pitch circle of the planetary gear ( 12 ). Thus, a slippage ratio s 1  between the sun roller ( 21 ) and the planetary roller ( 22 ) and a slippage ratio s 2  between the planetary roller ( 22 ) and the ring roller ( 23 ) are made equal to each other, and a large output torque can be provided from the planetary roller speed reduction mechanism ( 20 ).

TECHNICAL FIELD

The present invention relates to a composite planetary device wherein gears forming a planetary gear mechanism and a planetary roller mechanism are each integrally rotated around a common rotating center axis. It particularly relates to a composite planetary device having a planetary roller mechanism that provides high output torque.

BACKGROUND ART

Composite planetary devices comprised of a planetary gear mechanism and planetary roller mechanism are disclosed by JP A 9-168910 and JP A 2002-213566, for example. As disclosed in these patent documents, a planetary gear speed reducer can transmit a large torque but has the problems of backlash and meshing noise. A planetary roller speed reducer has zero backlash and low noise. However, it continually produces slippage, which makes it unsuitable for positioning mechanisms and the like, and also has the problem of not being able to transmit a large torque. A composite planetary device can mutually compensate for the drawbacks of a planetary gear speed reducer and planetary roller speed reducer, making it possible to effectively utilize the merits of both mechanisms.

However, conventional composite planetary devices have the following problems. With the composite planetary device disclosed by the above JP A 9-168910 and the like, as shown in the schematic diagram of FIG. 4, the radius of the working pitch circle of each of the gears of the planetary gear mechanism and the radius of each of the rollers of the planetary roller mechanism are the same. Therefore, the speed reduction ratio U_(g) of the planetary gear mechanism and the speed reduction ratio U_(r) of the planetary roller mechanism are the same, and the slippage ratio s₁ between the sun roller and planetary roller and the slippage ratio S₂ between the planetary roller and the ring roller are both zero. In this case, the roller drive force (tractive force) of the planetary roller mechanism is small, and the output torque is small.

As disclosed in JP A 2002-213566, in order to increase the torque, the roller drive force of the planetary roller mechanism can be increased by generating slippage between the rollers of the planetary roller mechanism. FIG. 5 is a schematic diagram of this case. Here, the radius of the sun roller is made larger by Δr₁ than the radius r₁ of the working pitch circle of the sun gear, along with which the radius of the planetary roller is made smaller by Δr₁ than the radius r₂ of the working pitch circle of the planetary gear, and the internal radius of the ring roller is also made smaller by Δr₁ than the radius r₃ of the working pitch circle of the internal gear. In this case, the speed reduction ratio U_(r) of the planetary roller mechanism is different from the speed reduction ratio U_(g) of the planetary gear mechanism, and slippage is generated between the sun roller and the planetary roller, and between the planetary roller and the ring roller.

In this case, the slippage between the planetary roller and the ring roller is in the opposite direction from the slippage between the sun roller and the planetary roller. For example, if a positive slippage ratio s₁ is applied between the sun roller and the planetary roller, a negative slippage ratio s₂ is generated between the planetary roller and the ring roller. Thus, the roller drive forces generated between the rollers cancel each other out, making it impossible to obtain a large output torque.

DISCLOSURE OF THE INVENTION

In view of the above problems, an object of the present invention is to provide a composite planetary device that can efficiently increase the output torque of a planetary roller mechanism.

To solve the above problems, a composite planetary device of the present invention comprises:

a planetary gear mechanism equipped with a sun gear, a planetary gear (or planetary gears) and an internal gear and a planetary roller mechanism equipped with a sun roller, a planetary roller (or planetary rollers) and a ring roller,

wherein the sun gear and the sun roller are integrally rotated around a common rotating center axis,

the planetary gear(s) and the planetary roller(s) are integrally rotated around a common planetary shaft (or common planetary shafts),

and the internal gear and the ring roller rotate integrally around the rotating center axis or can be fixed concentrically,

characterized in that a radius of the sun roller is larger by Δr₁ than a radius r₁ of a working pitch circle of the sun gear,

a radius of the planetary roller(s) is smaller by Δr₁ than a radius r₂₁ of the working pitch circle of the planetary gear(s),

a radius r₂₁ of a working pitch circle of the planetary gear meshing with the sun gear is larger than a radius r₂₃ of a working pitch circle of the planetary gear(s) meshing with the internal gear.

In the composite planetary device of this invention, slippage is generated between the sun roller and the planetary roller, and slippage is also generated between the planetary roller and the ring roller. Also, the direction and amount of the slippage of these parts can be made the same. That is, if s₁ is the slippage ratio between the sun roller and the planetary roller and s₂ is the slippage ratio between the planetary roller and the ring roller, s₁=s₂>0 can be effected.

A planetary roller mechanism having these slippage ratios can be achieved by combining gears of the planetary gear mechanism having numbers of teeth that satisfy equation (1), making the radius of the sun roller larger than the radius of the working pitch circle of the sun gear by a radius increase amount Δr₁ given by equation (2), and making the radius of the planetary roller larger than the radius of the working pitch circle of the planetary gear meshing with the internal gear by an amount Δr₂ given by equation (3). j=(Z _(d) −Z _(a))/2−Z _(b)>0   (1) Here

-   -   j: Planetary gear teeth reduction number     -   Z_(a): Number of sun gear teeth     -   Z_(b): Number of planetary gear teeth     -   Z_(d): Number of internal gear teeth

$\begin{matrix} {{\Delta\; r_{1}} = \frac{r_{21} - r_{23}}{\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)} + 1}} & (2) \\ {{\Delta\; r_{2}} = {r_{21} - r_{23} - {\Delta\; r_{1}}}} & (3) \end{matrix}$ Here

-   -   r₁: Radius of working pitch circle of sun gear     -   r₂₁: Radius of the working pitch circle of the planetary gear         meshing with the sun gear     -   r₂₃: Radius of the working pitch circle of the planetary gear         meshing with the internal gear     -   r₃: Radius of the working pitch circle of the internal gear

With the composite planetary device of this invention, the amount and direction of the slippage between the sun roller and the planetary roller in the planetary roller mechanism thereof are the same as the amount and direction of the slippage between the planetary roller and the ring roller. Therefore, the roller drive force generated between the rollers can be effectively output as the output torque. As a result, the output torque of the planetary roller mechanism can be increased, the function of the planetary roller mechanism in the low torque region of the planetary gear mechanism is superior to that of the planetary gear mechanism, the impact on the drive side tooth surfaces of the gears is decreased, making it possible to reduce meshing noise. Also, the high torque of the planetary roller mechanism also has the effect of increasing torsional stiffness in the low torque region of the planetary gear mechanism.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a cross-sectional view of a composite planetary device that applies the present invention.

FIG. 2 is a schematic diagram showing the configuration of the invention.

FIG. 3 is a diagram for explaining the calculation methods of equations (2) and (3).

FIG. 4 is a schematic diagram showing the configuration of a conventional composite planetary device.

FIG. 5 is a schematic diagram showing the configuration of a conventional composite planetary device.

BEST MODE FOR CARRYING OUT THE INVENTION

An example of a composite planetary speed reduction device that applies the present invention is described below, with reference to the drawings.

FIG. 1 is a cross-sectional view of a composite planetary speed reduction device of this example. The composite planetary speed reduction device 1 has an input shaft 2 disposed at one side and an output shaft 3 disposed at the other side, concentrically with a device axis 1 a, between which there are a planetary gear mechanism 10 and a planetary roller mechanism 20 disposed in parallel. Gears of the planetary gear mechanism 10 and corresponding rollers of the planetary roller mechanism 20 are respectively integrally rotated around the same rotating axes.

Described in further detail, a sun shaft 5 is fixedly coupled concentrically on the input shaft 2. On a tapered portion of the input shaft side of the sun shaft 5, there is formed a sun roller 21 positioned by a nut 4; and a sun gear 11 is formed on the output shaft side. The end portion 5 a of the output side of the sun shaft 5 rotatably supported by a planetary carrier 7, via a bearing 6. A plurality of planetary shafts 8 are affixed to an annular end surface 7 a of the input side of the planetary carrier 7. The planetary shafts 8 extend to the input side, parallel to the device axis 1 a. A planetary gear 12 and a planetary roller 22 are supported in a freely rotatable state by each of the planetary shafts 8. Each planetary gear 12 meshes with the sun gear 11, and each planetary roller 22 is in rolling contact with the sun roller 21.

The planetary carrier 7, planetary gear 12 and planetary roller 22 are enclosed by a cylindrical device housing 9. The planetary carrier 7 is supported by a bearing 9 a so that it freely rotates on the inside surface of the device housing 9. An internal gear 13 that meshes with the planetary gears 12 is integrally formed on a portion of the inside surface of the device housing 9 that is more towards the input shaft side than the bearing 9 a. Disposed concentrically on the input shaft side of the internal gear 13 is a ring roller 23 in rolling contact with the planetary rollers 22. The ring roller 23 is affixed to the device housing 9 via a roller support member 24. The output shaft 3 is formed integrally with the planetary carrier 7, and projects concentrically from the center of a circular end surface 7 b on the output side.

In order to increase the output torque of the planetary roller mechanism 20, the composite planetary speed reduction device 1 of this example is configured as shown in FIG. 2. Explained with reference to FIG. 2, it is set so that if s₁ is the slippage ratio between the sun roller 21 and the planetary rollers 22 and s₂ is the slippage ratio between the planetary rollers 22 and the ring roller 23, s₁=s₂>0. The relationship is satisfied by using a combination of the gears 11, 12 and 13 of the planetary gear mechanism 10 having numbers of teeth that satisfy equation (1). Also, the radius of the sun roller 21 is made larger than the radius r₁ of the working pitch circle of the sun gear 11 by a radius increase amount Δr₁ given by equation (2). In addition, the radius r₂₂ of the planetary rollers 22 is made larger than the radius r₂₃ of the working pitch circle of the planetary gears 12 meshing with the internal gear 13 by an amount Δr₂ given by equation (3). j=(Z _(d) −Z _(a))/2−Z _(b)>0   (1) Here

-   -   j: Planetary gear teeth reduction number     -   Z_(a): Number of sun gear teeth     -   Z_(b): Number of planetary gear teeth     -   Z_(d): Number of internal gear teeth

$\begin{matrix} {{\Delta\; r_{1}} = \frac{r_{21} - r_{23}}{\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)} + 1}} & (2) \\ {{\Delta\; r_{2}} = {r_{21} - r_{23} - {\Delta\; r_{1}}}} & (3) \end{matrix}$ Here

-   -   r₁: Radius of working pitch circle of sun gear     -   r₂₁: Radius of the working pitch circle of the planetary gear         meshing with the sun gear     -   r₂₃: Radius of the working pitch circle of the planetary gear         meshing with the internal gear     -   r₃: Radius of the working pitch circle of the internal gear

By combining teeth numbers to satisfy the condition 0<j of equation (1), the radius r₂₃ of the working pitch circle of the planetary gear 12 meshing with the internal gear 13 becomes smaller than the radius r₂₁ of the working pitch circle of the planetary gear 12 meshing with the sun gear 11, as drawn in an exaggerated way in the schematic drawing of FIG. 2. Also, equation (2) and equation (3) are calculated from the condition that the slippage ratio s₁ between the sun roller 21 and the planetary roller 22 and the slippage ratio s₂ between the planetary roller 22 and the ring roller 23 become equal. To satisfy equation (2) and equation (3), the radius of the sun roller 21 is made larger than the ratio r₁ of the working pitch of the sun gear 11 by an amount Δr₁, and the radius of the planetary roller 22 is made smaller than the radius r₂₁ of the working pitch circle of the planetary gear 12 meshing with the sun gear 11 by an amount Δr₁, and the inside radius of the ring roller 23 is set so that it contacts the radius of the planetary roller 22. As a result, the slippage ratio s₁ between the sun roller 21 and the planetary roller 22 and the slippage ratio s₂ between the planetary roller 22 and the ring roller 23 can be made equal. Since s₁ and s₂ are equal, the tractive force F generated by the two rollers acts in the same direction, so the total tractive force is 2F, so a large torque is obtained.

With the composite planetary speed reduction device 1 of this example, even if backlash between the gears of the planetary gear mechanism 10 is allowed for the purpose of reducing costs, zero backlash can be achieved since there is no backlash between the rollers of planetary roller speed reduction mechanism 20.

Also, since a large torque output can be obtained from the planetary roller speed reduction mechanism 20, in the low torque region of the planetary gear mechanism the function of the planetary roller mechanism 20 is superior to that of the planetary gear speed reduction mechanism 10, the impact on the drive side tooth surfaces of the gears is decreased, making it possible to reduce meshing noise. Also, since a large output torque is obtained from the planetary roller speed reduction mechanism 20, torsional stiffness in the low torque region of the planetary gear speed reduction mechanism 10 can be increased.

Moreover, in high torque regions the planetary gear speed reduction mechanism 10 becomes superior, enabling the transmission of high torque.

EXAMPLE

An example of the composite planetary speed reduction device 1 having the above configuration will now be described. A sun gear having a number of teeth Z_(a)=24, planetary gears each having a number of teeth Z_(b)=36, and an internal gear having a number of teeth Z_(d)=96 is a general example of a tooth-number combination used in planetary gear speed reduction mechanisms. In this case, the speed reduction ratio U_(g) is 1/5. Because addendum modification coefficient of zero can be used for the gears, enabling the use of standard gears and eliminating the task of design, this combination of teeth numbers is extensively used. However, in this tooth-number combination, the value of j defined by the above equation (1) is zero, so slippage ratios s₁ and s₂ between rollers are also zero, so a large tractive force cannot be obtained (see the schematic drawing of FIG. 3).

In this example, the number of teeth of the planetary gear 12 is reduced by one, to Z_(b)=35, and j=1. In this case, the reduction ratio of the planetary gear speed reduction mechanism 10 is the same as the above, U_(g)=1/5. Also, each gear of the planetary gear speed reduction mechanism 10 is an involute spur gear; the gear data are shown in Table 1. As can be seen from the table, r₂₁>r₂₃.

TABLE 1 Sun Gear Planetary Gear Internal Gear Tool m = 1.0, pressure angle = 20°, full depth tooth Number of Teeth 24 35 96 Addendum 0.3529 0.3400 0 Modification Coefficient Center Distance (mm) — 30.1436 — Working Pitch Circle 12.2618 r₂₁ = 17.8818 47.4391 Radius (mm) r₂₃ = 17.2955

Next, when equation (2) is used to calculate the radius increase amount Δr₁ of the sun roller 21 from the gear data shown in the table, we get Δr₁=0.1236 mm. Also, Δr₂=0.4626 is obtained from equation (3). Therefore, the radius of the sun roller 21 is 12.3854 mm, the radius of the planetary roller 22 is 17.7581, and the inside radius of the ring roller 23 is 47.9017. As a result, the speed reduction ratio U_(r) of the planetary roller speed reduction mechanism 20 is 1/4.868.

From the above, the slippage ratio s₁ between the sun roller 21 and the planetary roller 22 is 1.7%, and the slippage ratio s₂ between the planetary roller 22 and the ring roller 23 is 1.7%, satisfying s₁=s₂, so that as shown in the schematic drawing of FIG. 3, a planetary roller speed reduction mechanism 20 can be achieved that can output a large tractive force.

(Method of Calculating Equations (2) and (3))

The method of calculating equations (2) and (3) will now be explained with reference to FIG. 3.

(1) Finding the slippage ratio between rollers when the roller radius is made Δr larger or smaller than the radius of the working pitch circle of a gear (carrier fixed).

(a) Slippage ratio s₁ (between sun roller and planetary roller)

$\begin{matrix} \begin{matrix} {s_{1} = \frac{\upsilon_{1}^{\prime} - \upsilon_{2}^{\prime}}{\frac{\upsilon_{1}^{\prime} + \upsilon^{\prime}}{2}}} \\ {= \frac{2\left( {{r_{1}^{\prime}\omega_{1}} - {r_{2}^{\prime}\omega_{2}}} \right)}{{r_{1}^{\prime}\omega_{1}} + {r_{2}^{\prime}\omega_{2}}}} \\ {= \frac{2\left\lbrack {{\left( {r_{1} + {\Delta\; r_{1}}} \right)\omega_{1}} - {\left( {r_{21} - {\Delta\; r_{1}}} \right)\omega_{2}}} \right\rbrack}{{\left( {r_{1} + {\Delta\; r_{1}}} \right)\omega_{1}} + {\left( {r_{21} - {\Delta\; r_{1}}} \right)\omega_{2}}}} \\ {= \frac{2\left\lbrack {{\left( {r_{1} + {\Delta\; r_{1}}} \right)\omega_{1}} - {\left( {r_{21} - {\Delta\; r_{1}}} \right)\frac{r_{1}}{r_{21}}\omega_{1}}} \right\rbrack}{{\left( {r_{1} + {\Delta\; r_{1}}} \right)\omega_{1}} + {\left( {r_{21} - {\Delta\; r_{1}}} \right)\frac{r_{1}}{r_{21}}\omega_{1}}}} \\ {= \frac{2\left\lbrack {\left( {r_{1} + {\Delta\; r_{1}}} \right) - {\left( {r_{21} - {\Delta\; r_{1}}} \right)\frac{r_{1}}{r_{21}}}} \right\rbrack}{\left( {r_{1} + {\Delta\; r_{1}}} \right) + {\left( {r_{21} - {\Delta\; r_{1}}} \right)\frac{r_{1}}{r_{21}}}}} \\ {= \frac{2\left\lbrack {\left( {r_{1} + {\Delta\; r_{1}}} \right) - \left( {r_{1} - {\Delta\; r_{1}\frac{r_{1}}{r_{21}}}} \right)} \right\rbrack}{\left( {r_{1} + {\Delta\; r_{1}}} \right) + \left( {r_{1} - {\Delta\; r_{1}\frac{r_{1}}{r_{21}}}} \right)}} \\ {{= \frac{2\Delta\;{r_{1}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}}{{2r_{1}} + {\Delta\;{r_{1}\left( {1 - \frac{r_{1}}{r_{21}}} \right)}}}},\left\lbrack {{2r_{1}} ⪢ {\Delta\;{r_{1}\left( {1 - \frac{r_{1}}{r_{21}}} \right)}}} \right\rbrack} \\ {\overset{\sim}{=}\frac{\Delta\;{r_{1}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}}{r_{1}}} \end{matrix} & (A) \end{matrix}$

(b) Slippage ratio s₂ (between planetary roller and internal gear roller)

$\begin{matrix} \begin{matrix} {s_{2} = \frac{\upsilon_{2}^{\prime} - \upsilon_{3}^{\prime}}{\frac{\upsilon_{2}^{\prime} + \upsilon_{3}^{\prime}}{2}}} \\ {= \frac{2\left( {{r_{2}^{\prime}\omega_{2}} - {r_{3}^{\prime}\omega_{3}}} \right)}{{r_{2}^{\prime}\omega_{2}} + {r_{3}^{\prime}\omega_{3}}}} \\ {= \frac{2\left\lbrack {{\left( {r_{23} + {\Delta\; r_{2}}} \right)\omega_{2}} - {\left( {r_{3} + {\Delta\; r_{2}}} \right)\omega_{3}}} \right\rbrack}{{\left( {r_{23} + {\Delta\; r_{2}}} \right)\omega_{2}} + {\left( {r_{3} + {\Delta\; r_{2}}} \right)\omega_{3}}}} \\ {= \frac{2\left\lbrack {{\left( {r_{23} + {\Delta\; r_{2}}} \right)\omega_{2}} - {\left( {r_{3} + {\Delta\; r_{2}}} \right)\frac{r_{23}}{r_{3}}\omega_{2}}} \right\rbrack}{{\left( {r_{23} + {\Delta\; r_{2}}} \right)\omega_{2}} + {\left( {r_{3} + {\Delta\; r_{2}}} \right)\frac{r_{23}}{r_{3}}\omega_{2}}}} \\ {= \frac{2\left\lbrack {\left( {r_{23} + {\Delta\; r_{2}}} \right) - {\left( {r_{3} + {\Delta\; r_{2}}} \right)\frac{r_{23}}{r_{3}}}} \right\rbrack}{\left( {r_{23} + {\Delta\; r_{2}}} \right) + {\left( {r_{3} + {\Delta\; r_{2}}} \right)\frac{r_{23}}{r_{3}}}}} \\ {= \frac{2\left\lbrack {\left( {r_{23} + {\Delta\; r_{2}}} \right) - \left( {r_{23} + {\Delta\; r_{2}\frac{r_{23}}{r_{3}}}} \right)} \right\rbrack}{\left( {r_{23} + {\Delta\; r_{2}}} \right) + \left( {r_{23} + {\Delta\; r_{2}\frac{r_{23}}{r_{3}}}} \right)}} \\ {{= \frac{2\Delta\;{r_{2}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}}{{2r_{23}} + {\Delta\;{r_{2}\left( {1 + \frac{r_{23}}{r_{3}}} \right)}}}},\left\lbrack {{2r_{23}} ⪢ {\Delta\;{r_{2}\left( {1 + \frac{r_{23}}{r_{3}}} \right)}}} \right\rbrack} \\ {\overset{\sim}{=}\frac{\Delta\;{r_{2}\left( {1 + \frac{r_{23}}{r_{3}}} \right)}}{r_{23}}} \end{matrix} & (B) \end{matrix}$

(2) Δr₁ and Δr₂ that constitute s₁=s₂

Equating equation (A) and equation (B)

$\begin{matrix} {\;{{\frac{\Delta\;{r_{1}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}}{r_{1}} = \frac{\Delta\;{r_{2}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}}{r_{23}}}{\frac{\Delta\; r_{1}}{\Delta\; r_{2}} = \frac{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}}}} & (C) \end{matrix}$

Also, as is clear from the figure Δr ₁ +Δr ₂ =r ₂₁ −r ₂₃   (D)

Substituting Δr₂ from equation (D) into equation (C)

$\begin{matrix} \begin{matrix} {\frac{\Delta\; r_{1}}{r_{21} - r_{23} - {\Delta\; r_{1}}} = \frac{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}} \\ {\frac{\Delta\; r_{1}}{r_{21} - r_{23} - {\Delta\; r_{1}}} = \frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}} \\ {{r_{21} - r_{23} - {\Delta\; r_{1}}} = {\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{23}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}\Delta\; r_{1}}} \\ {{r_{21} - r_{23}} = {{\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)}\Delta\; r_{1}} + {\Delta\; r_{1}}}} \\ {= {\left\lbrack {\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)} + 1} \right\rbrack\Delta\; r_{1}}} \\ {{{Therefore}\text{,}}\;} \\ {{\Delta\; r_{1}} = \frac{r_{21} - r_{23}}{\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)} + 1}} \end{matrix} & (2) \end{matrix}$

And, from equation (D) Δr ₂ +Δr ₂₁ =r ₂₃ −r ₁   (3)

SYMBOLS

-   a: Center distance -   r₁: Radius of working pitch circle of the sun gear -   r₂₁: Radius of the working pitch circle of the planetary gear     meshing with the sun gear -   r₂₃: Radius of the working pitch circle of the planetary gear     meshing with the internal gear -   r₃: Radius of working pitch circle of the internal gear -   r₁′: Outside diameter of the sun roller (r₁′=r₁+Δr₁) -   r₂′: Outside diameter of the planetary roller (r₂′=r₂₁−Δr₁ or     r₂′=r₂₃+Δr₂) -   r₃′: Inside diameter of the internal gear roller (r₃′=r₃+Δr₂) -   s₁: Slippage ratio between sun roller and planetary roller -   s₂: Slippage ratio between planetary roller and internal gear roller -   v₁′: Peripheral velocity at the outside radius of the sun roller -   v₂′: Peripheral velocity at the outside radius of the planetary     roller -   v₃′: Peripheral velocity at the inside radius of the internal gear     roller -   ω₁: Rotational angle velocity of the sun gear -   ω₂: Rotational angle velocity of the planetary gear -   ω₃: Rotational angle velocity of the internal gear -   Δr₁: Radius increase amount of the sun roller -   Δr₂: Radius increase amount of the planetary roller 

1. A composite planetary device, comprising: a planetary gear mechanism equipped with a sun gear, at least one planetary gear and an internal gear; and a planetary roller mechanism equipped with a sun roller, at least one planetary roller and a ring roller; wherein the sun gear and the sun roller are integrally rotated around a common rotating center axis, the corresponding planetary gear and the planetary roller are integrally rotated around a common planetary shaft, and the internal gear and the ring roller rotate integrally around the rotating center axis or can be fixed concentrically, wherein a radius of the sun roller is larger by (Δr₁) than a radius (r₁) of a working pitch circle of the sun gear, a radius of the planetary roller is smaller by (Δr₁) than a radius (r₂₁) of a working pitch circle of the planetary gear, the radius (r₂₁) of the working pitch circle of the planetary gear meshing with the sun gear is larger than a radius (r₂₃) of a working pitch circle of the planetary gear meshing with the internal gear.
 2. The composite planetary device according to claim 1, wherein gears of the planetary gear mechanism have numbers of teeth that satisfy equation (1), the radius of the sun roller is larger than the radius of the working pitch circle of the sun gear by a radius increase amount (Δr₁)given by equation (2), the radius of the planetary roller is larger than the radius of the working pitch circle of the planetary gear meshing with the internal gear by an amount (Δr₂) given by equation (3) j=(Z _(d) −Z _(a))/2−Z _(b)>0   (1) where j: Planetary gear teeth reduction number Z_(a): Number of sun gear teeth Z_(b): Number of planetary gear teeth Z_(d): Number of internal gear teeth $\begin{matrix} {{\Delta\; r_{1}} = \frac{r_{21} - r_{23}}{\frac{r_{23}\left( {1 + \frac{r_{1}}{r_{21}}} \right)}{r_{1}\left( {1 - \frac{r_{23}}{r_{3}}} \right)} + 1}} & (2) \end{matrix}$ where r₁: Radius of working pitch circle of sun gear r₂₁: Radius of the working pitch circle of the planetary gear meshing with the sun gear r₂₃: Radius of the working pitch circle of the planetary gear meshing with the internal gear r₃: Radius of the working pitch circle of the internal gear Δr ₂ =r ₂₁ −r ₂₃ −Δr ₁   (3). 